package com.fishercoder.solutions;

/**
 * 265. Paint House II
 *
 * There are a row of n houses, each house can be painted with one of the k colors.
 * The cost of painting each house with a certain color is different.
 * You have to paint all the houses such that no two adjacent houses have the same color.
 * The cost of painting each house with a certain color is represented by a n x k cost matrix.
 *
 * For example, costs[0][0] is the cost of painting house 0 with color 0;
 * costs[1][2] is the cost of painting house 1 with color 2,
 * and so on...
 *
 * Find the minimum cost to paint all houses.

 Note:
 All costs are positive integers.

 Follow up:
 Could you solve it in O(nk) runtime?
 */
public class _265 {

	public static class Solution1 {
		public int minCostII(int[][] costs) {
			if (costs == null || costs.length == 0) {
				return 0;
			}

			int n = costs.length;
			int k = costs[0].length;
			// min1 is the index of the 1st-smallest cost till previous house
			// min2 is the index of the 2nd-smallest cost till previous house
			int min1 = -1;
			int min2 = -1;

			for (int i = 0; i < n; i++) {
				int last1 = min1;
				int last2 = min2;
				min1 = -1;
				min2 = -1;

				for (int j = 0; j < k; j++) {
					if (j != last1) {
						// current color j is different to last min1
						costs[i][j] += last1 < 0 ? 0 : costs[i - 1][last1];
					} else {
						costs[i][j] += last2 < 0 ? 0 : costs[i - 1][last2];
					}

					// find the indices of 1st and 2nd smallest cost of painting current house i
					if (min1 < 0 || costs[i][j] < costs[i][min1]) {
						min2 = min1;
						min1 = j;
					} else if (min2 < 0 || costs[i][j] < costs[i][min2]) {
						min2 = j;
					}
				}
			}
			return costs[n - 1][min1];
		}
	}

}
